B. Analysis of Variance

# Start the mixlm R package
library(mixlm, warn.conflicts = FALSE)

Analysis of Variance (ANOVA)

This vignette will focus on univariate ANOVA in various designs including fixed and mixed effects, and briefly introduce multivariate ANOVA. Models using random effects will be run through the mixlm package.

The following models will be demonstrated: * Fixed effect models * One-way ANOVA * Two-way ANOVA * Covariates in ANOVA * Fixed effect nested ANOVA * Linear mixed models * Classical LMM * Repeated measures LMM

Simulated data

We will start by simulating some data to use in the examples below. In this fictitious setup, milk yield is measured as a function of feed type (low/high protein content), cow breed, bull identity, daughter and age. The three first factors are crossed and balanced, while daughter is nested under bull.

The yield is generated with a linear model with some noise.

set.seed(123)
dat <- data.frame(
  feed  = factor(rep(rep(c("low","high"), each=6), 4)),
  breed = factor(rep(c("NRF","Hereford","Angus"), 16)),
  bull  = factor(rep(LETTERS[1:4], each = 12)),
  daughter = factor(rep(letters[1:4], 12)),
  age   = round(rnorm(48, mean = 36, sd = 5))
)
dat$yield <- 150*with(dat, 10 + 3 * as.numeric(feed) + as.numeric(breed) + 
                        2 * as.numeric(bull) + 1 * as.numeric(sample(dat$daughter, 48)) + 
                        0.5 * age + rnorm(48, sd = 2))
head(dat)
#>   feed    breed bull daughter age    yield
#> 1  low      NRF    A        a  33 5541.301
#> 2  low Hereford    A        b  35 5662.560
#> 3  low    Angus    A        c  44 6354.182
#> 4  low      NRF    A        d  36 6325.363
#> 5  low Hereford    A        a  37 6144.458
#> 6  low    Angus    A        b  45 6187.227

Fixed effect models

The simplest form of ANOVA is the fixed effect model. This model assumes that the levels of the factor are fixed and that the only source of variation is the factor itself.

One-way ANOVA

Here we assess only the feed effect on yield, i.e., the following model: \[yield_{an} = \mu + feed_a + \epsilon_{an}\] where \(a\) is the feed level and \(n\) is the observation within the feed level.

mod <- lm(yield ~ feed, data = dat)
print(anova(mod))
#> Analysis of Variance Table
#> 
#> Response: yield
#>           Df   Sum Sq Mean Sq F value  Pr(>F)  
#> feed       1   957882  957882  3.1072 0.08459 .
#> Residuals 46 14180730  308277                  
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

In the ANOVA table one can look at Pr(>F) to see if the feed factor has a significant effect on yield. The summary function can be used to get more information about the underlying regression model.

summary(mod)
#> 
#> Call:
#> lm(formula = yield ~ feed, data = dat)
#> 
#> Residuals:
#>     Min      1Q  Median      3Q     Max 
#> -954.25 -480.25   75.11  470.14 1240.91 
#> 
#> Coefficients:
#>             Estimate Std. Error t value Pr(>|t|)    
#> (Intercept)  6354.28      80.14  79.290   <2e-16 ***
#> feed(low)    -141.27      80.14  -1.763   0.0846 .  
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#> 
#> s: 555.2 on 46 degrees of freedom
#> Multiple R-squared: 0.06327,
#> Adjusted R-squared: 0.04291 
#> F-statistic: 3.107 on 1 and 46 DF,  p-value: 0.08459

Basic model assessment can be done using the plot function.

old.par <- par(mfrow=c(2,1), mar=c(4,4,2,0.5))
plot(mod, which = 1:2, ask=FALSE)

par(old.par)

Two-way crossed effects ANOVA

Here we assess the feed and breed effects and their interaction effect on yield, i.e., the following model: \[yield_{abn} = \mu + feed_a + breed_b + (feed:breed)_{ab} + \epsilon_{abn}\] where \(a\) is the feed level and \(n\) is the observation within the feed level.

mod <- lm(yield ~ feed*breed, data = dat)
print(anova(mod))
#> Analysis of Variance Table
#> 
#> Response: yield
#>            Df   Sum Sq Mean Sq F value Pr(>F)  
#> feed        1   957882  957882  2.9904 0.0911 .
#> breed       2   284231  142116  0.4437 0.6447  
#> feed:breed  2   443052  221526  0.6916 0.5064  
#> Residuals  42 13453447  320320                 
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

If the interaction effect is not significant, we can simplify the model to: \[yield_{abn} = \mu + feed_a + breed_b + \epsilon_{abn}\]

mod <- lm(yield ~ feed+breed, data = dat)
print(anova(mod))
#> Analysis of Variance Table
#> 
#> Response: yield
#>           Df   Sum Sq Mean Sq F value  Pr(>F)  
#> feed       1   957882  957882  3.0329 0.08858 .
#> breed      2   284231  142116  0.4500 0.64055  
#> Residuals 44 13896499  315830                  
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

Types of sums of squares

The classical way of defining sums of squares are Type I, Type II, and Type III, as described in the documentation of the Anova() function in the car package.

# Type I - Sequential testing, including one and one effect
print(anova(mod))
#> Analysis of Variance Table
#> 
#> Response: yield
#>           Df   Sum Sq Mean Sq F value  Pr(>F)  
#> feed       1   957882  957882  3.0329 0.08858 .
#> breed      2   284231  142116  0.4500 0.64055  
#> Residuals 44 13896499  315830                  
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

# Type II - Testing each term after all others, 
# except ignoring the term's higher-order relatives
print(Anova(mod, type="II"))
#> Anova Table (Type II tests)
#> 
#> Response: yield
#>             Sum Sq Df F value  Pr(>F)  
#> feed        957882  1  3.0329 0.08858 .
#> breed       284231  2  0.4500 0.64055  
#> Residuals 13896499 44                  
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

# Type III - Testing each term after all others,
# including the term's higher-order relatives
print(Anova(mod, type="III"))
#> Anova Table (Type III tests)
#> 
#> Response: yield
#>                 Sum Sq Df   F value  Pr(>F)    
#> (Intercept) 1938092247  1 6136.5139 < 2e-16 ***
#> feed            957882  1    3.0329 0.08858 .  
#> breed           284231  2    0.4500 0.64055    
#> Residuals     13896499 44                      
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

For the two-way ANOVA model, the Type I and Type II sums of squares are the same, while Type III differs. With balanced data, this only happens when the contrast coding is of the treatment/reference type.

Contrast codings

The contrast coding can be specified for each factor in the model. The default is reference coding, but other codings can be specified using the contrasts Since we are running lm() through the mixlm package, we can use the contrasts argument to specify the coding for all effects simultaneously.

# Sum-coding, i.e., the sum of all levels is zero and all effects
# are orthogonal in the balanced case.
mod <- lm(yield ~ feed*breed, data = dat, contrasts="contr.sum")
print(Anova(mod, type="III"))
#> Anova Table (Type III tests)
#> 
#> Response: yield
#>                 Sum Sq Df   F value Pr(>F)    
#> (Intercept) 1938092247  1 6050.4845 <2e-16 ***
#> feed            957882  1    2.9904 0.0911 .  
#> breed           284231  2    0.4437 0.6447    
#> feed:breed      443052  2    0.6916 0.5064    
#> Residuals     13453447 42                     
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

# Weighted coding, i.e., the sum of all levels is zero and the effects
# are weighted by the number of levels, effect-wise.
mod <- lm(yield ~ feed*breed, data = dat, contrasts="contr.weighted")
print(Anova(mod, type="III"))
#> Anova Table (Type III tests)
#> 
#> Response: yield
#>                 Sum Sq Df   F value Pr(>F)    
#> (Intercept) 1938092247  1 6050.4845 <2e-16 ***
#> feed            957882  1    2.9904 0.0911 .  
#> breed           284231  2    0.4437 0.6447    
#> feed:breed      443052  2    0.6916 0.5064    
#> Residuals     13453447 42                     
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

Instead of specifying the contrasts in a specific model, it is also possible to set the contrasts globally for the session. This means that all subsequent models, unless specified otherwise, will use the specified contrasts.

options(contrasts = c("contr.sum", "contr.poly"))

Covariates in ANOVA

Adding covariates to an ANOVA model is straightforward. Here we add the age of the cow as a covariate to the two-way ANOVA model. The model becomes: \[yield_{abn} = \mu + feed_a + breed_b + (feed:breed)_{ab} + age\cdot x_{abn} + \epsilon_{abn},\] where \(x_{abn}\) is the age of the cow and \(age\) is its linear coefficient.

mod <- lm(yield ~ feed*breed + age, data = dat)
print(Anova(mod, type="II"))
#> Anova Table (Type II tests)
#> 
#> Response: yield
#>             Sum Sq Df F value    Pr(>F)    
#> feed        938176  1  4.3325   0.04368 *  
#> breed       368528  2  0.8509   0.43442    
#> age        4575110  1 21.1278 4.064e-05 ***
#> feed:breed   73643  2  0.1700   0.84422    
#> Residuals  8878337 41                      
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

Fixed effect nested ANOVA

In the case of nested factors, we can specify this in the model. In the current model, we assume that bulls are fixed effects that we are interested in and that daughters are nested under bulls. In this case, the daughters do not have any special attributes that would interfere with the estimation of the bull effect, so we do not have to assume that they are random effects. The model becomes: \[yield_{abn} = \mu + bull_a + daugter_{b(a)} + \epsilon_{abn},\]

mod <- lm(yield ~ bull + daughter%in%bull, data = dat)
print(Anova(mod, type="II"))
#> Anova Table (Type II tests)
#> 
#> Response: yield
#>                Sum Sq Df F value    Pr(>F)    
#> bull          6293005  3  8.9924 0.0001822 ***
#> bull:daughter 1380934 12  0.4933 0.9034247    
#> Residuals     7464672 32                      
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

Linear mixed models

Adding random effects to a model can be done either using least squares modelling through the mixlm package or using ML/REML estimation through the lme4 package (or similar).

Classical - mixlm

Using the mixlm package, we specify the random effects using the r() function. If we assume that the bull is a random selection from the population of bulls, we can specify this as a random effect when focusing on feed. The model looks like a fixed effect model, but the error structure is different: \[yield_{abn} = \mu + feed_a + breed_b + (feed:breed)_{ab} + \epsilon_{abn}\]

mod <- lm(yield ~ feed*r(bull), data = dat)
print(Anova(mod, type="II"))
#> Analysis of variance (unrestricted model)
#> Response: yield
#>              Mean Sq     Sum Sq Df F value Pr(>F)
#> feed       957881.78  957881.78  1    3.75 0.1481
#> bull      2097668.39 6293005.18  3    8.22 0.0587
#> feed:bull  255297.76  765893.29  3    1.43 0.2472
#> Residuals  178045.79 7121831.56 40       -      -
#> 
#>             Err.term(s) Err.df VC(SS)
#> 1 feed              (3)      3  fixed
#> 2 bull              (3)      3 153531
#> 3 feed:bull         (4)     40  12875
#> 4 Residuals           -      - 178046
#> (VC = variance component)
#> 
#>           Expected mean squares
#> feed      (4) + 6 (3) + 24 Q[1]
#> bull      (4) + 6 (3) + 12 (2) 
#> feed:bull (4) + 6 (3)          
#> Residuals (4)

In addition to the ordinary ANOVA table, an overview of variance components and expected mean squares are printed.

Restrictions

The mixlm package has unrestricted models as default, but it is possible to turn on restriction.

mod <- lm(yield ~ feed*r(bull), data = dat, unrestricted = FALSE)
print(Anova(mod, type="II"))
#> Analysis of variance (restricted model)
#> Response: yield
#>              Mean Sq     Sum Sq Df F value Pr(>F)
#> feed       957881.78  957881.78  1    3.75 0.1481
#> bull      2097668.39 6293005.18  3   11.78 0.0000
#> feed:bull  255297.76  765893.29  3    1.43 0.2472
#> Residuals  178045.79 7121831.56 40       -      -
#> 
#>             Err.term(s) Err.df VC(SS)
#> 1 feed              (3)      3  fixed
#> 2 bull              (4)     40 159969
#> 3 feed:bull         (4)     40  12875
#> 4 Residuals           -      - 178046
#> (VC = variance component)
#> 
#>           Expected mean squares
#> feed      (4) + 6 (3) + 24 Q[1]
#> bull      (4) + 12 (2)         
#> feed:bull (4) + 6 (3)          
#> Residuals (4)

This effects which tests are performed and how the variance components are estimated.

Repeated Measures

A repeated measures model can be a mixed model with a random effect for the repeated measures, where the repeated measures are nested under the subjects. Longitudinal data is a common example of repeated measures data, where the replicates are repetitions over time within subject. If we subset the simulated data, we can add a longitudinal effect to the model, in this case a random variation over three time-points. The time effect does not necessarily need to be random.

set.seed(123)
long <- dat[c(1:4,9:12), c("feed", "daughter", "yield")]
long <- rbind(long, long, long)
long$time  <- factor(rep(1:3, each=8))
long$yield <- long$yield + rnorm(24, sd = 100) + rep(c(-200,0,200), each=8)
plot(yield~daughter, data=long)

Now we have a feed effect, individuals (daughters), and a time effect repeated inside daughters, with the model: \[yield_{ait} = \mu + daughter_i + feed_a + time_t + (feed:time)_{at} + \epsilon_{ait}\]

mod <- lm(yield ~ r(daughter) + feed*r(time), data = long, unrestricted=FALSE)
print(Anova(mod, type="II"))
#> Analysis of variance (restricted model)
#> Response: yield
#>             Mean Sq     Sum Sq Df F value Pr(>F)
#> daughter  939109.89 2817329.67  3   18.26 0.0000
#> feed      265158.98  265158.98  1   86.27 0.0114
#> time      213465.79  426931.58  2    4.15 0.0368
#> feed:time   3073.71    6147.41  2    0.06 0.9422
#> Residuals  51429.27  771439.11 15       -      -
#> 
#>             Err.term(s) Err.df VC(SS)
#> 1 daughter          (5)     15 147947
#> 2 feed              (4)      2  fixed
#> 3 time              (5)     15  20255
#> 4 feed:time         (5)     15 -12089
#> 5 Residuals           -      -  51429
#> (VC = variance component)
#> 
#>           Expected mean squares
#> daughter  (5) + 6 (1)          
#> feed      (5) + 4 (4) + 12 Q[2]
#> time      (5) + 8 (3)          
#> feed:time (5) + 4 (4)          
#> Residuals (5)

REML

REML estimation can be done directly with the lme4 package, but we can also do this through the mixlm package, leveraging the r() function.

mod <- lm(yield ~ feed*r(bull), data = dat, REML = TRUE)
print(Anova(mod, type="III"))
#> Analysis of Deviance Table (Type III Wald chisquare tests)
#> 
#> Response: yield
#>               Chisq Df Pr(>Chisq)    
#> (Intercept) 923.918  1    < 2e-16 ***
#> feed          3.752  1    0.05274 .  
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

To see how mixlm transforms the model to lme4, we can print the model.

print(mod)
#> Linear mixed model fit by REML ['lmerMod']
#> Formula: yield ~ feed + (1 | bull) + (1 | feed:bull)
#>    Data: dat
#> REML criterion at convergence: 702.8962
#> Random effects:
#>  Groups    Name        Std.Dev.
#>  feed:bull (Intercept) 113.5   
#>  bull      (Intercept) 391.8   
#>  Residual              422.0   
#> Number of obs: 48, groups:  feed:bull, 8; bull, 4
#> Fixed Effects:
#> (Intercept)        feed1  
#>      6354.3       -141.3

We observe that (1 | bull) and (1 | feed:bull) are added to the model, which means that random intercepts are added for both bull and the interaction.

Multivariate ANOVA (MANOVA)

Basic multivariate ANOVA can be done using the lm() function, if we create a matrix of responses. In this case, we add a mastitis effect to the model.

dat$mastitis <- as.numeric(dat$breed) + as.numeric(dat$feed) + rnorm(48, sd = 1)

The model becomes: \[[yield_{abn} | mastitis_{abn}] = \mu + feed_a + breed_b + (feed:breed)_{ab} + \epsilon_{abn},\] where each of the model terms now are vectors matching the number of responses.

mod <- lm(cbind(yield,mastitis) ~ feed*breed, data = dat)
print(Anova(mod, type="II"))
#> 
#> Type II MANOVA Tests: Pillai test statistic
#>            Df test stat approx F num Df den Df    Pr(>F)    
#> feed        1   0.20074   5.1487      2     41 0.0101188 *  
#> breed       2   0.47524   6.5453      4     84 0.0001235 ***
#> feed:breed  2   0.15162   1.7226      4     84 0.1525975    
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

The test statistics are joint for all responses, here in the form of the default Pillai’s test statistics. Other statistics can be produced as follows:

print(Anova(mod, type="II", test="Wilks"))
#> 
#> Type II MANOVA Tests: Wilks test statistic
#>            Df test stat approx F num Df den Df   Pr(>F)    
#> feed        1   0.79926   5.1487      2     41  0.01012 *  
#> breed       2   0.52507   7.7908      4     82 2.26e-05 ***
#> feed:breed  2   0.84974   1.7387      4     82  0.14936    
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
print(Anova(mod, type="II", test="Hotelling-Lawley"))
#> 
#> Type II MANOVA Tests: Hotelling-Lawley test statistic
#>            Df test stat approx F num Df den Df    Pr(>F)    
#> feed        1   0.25115   5.1487      2     41   0.01012 *  
#> breed       2   0.90391   9.0391      4     80 4.473e-06 ***
#> feed:breed  2   0.17522   1.7522      4     80   0.14676    
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
print(Anova(mod, type="II", test="Roy"))
#> 
#> Type II MANOVA Tests: Roy test statistic
#>            Df test stat approx F num Df den Df    Pr(>F)    
#> feed        1   0.25115   5.1487      2     41   0.01012 *  
#> breed       2   0.90326  18.9685      2     42 1.351e-06 ***
#> feed:breed  2   0.16551   3.4757      2     42   0.04010 *  
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

The summary function can be used to get more information about the underlying regression model, here revealing the regressions are performed separately for each response.

summary(mod)
#> Response yield :
#> 
#> Call:
#> lm(formula = yield ~ feed * breed, data = dat)
#> 
#> Residuals:
#>      Min       1Q   Median       3Q      Max 
#> -1148.50  -489.54   -25.54   349.48  1142.16 
#> 
#> Coefficients:
#>                            Estimate Std. Error t value Pr(>|t|)    
#> (Intercept)                 6354.28      81.69  77.785   <2e-16 ***
#> feed(high)                  -141.27      81.69  -1.729   0.0911 .  
#> breed(Angus)                 -71.72     115.53  -0.621   0.5381    
#> breed(Hereford)              -35.02     115.53  -0.303   0.7633    
#> feed(high):breed(Angus)      -46.25     115.53  -0.400   0.6909    
#> feed(high):breed(Hereford)   133.76     115.53   1.158   0.2535    
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#> 
#> Residual standard error: 566 on 42 degrees of freedom
#> Multiple R-squared:  0.1113, Adjusted R-squared:  0.00552 
#> F-statistic: 1.052 on 5 and 42 DF,  p-value: 0.4003
#> 
#> 
#> Response mastitis :
#> 
#> Call:
#> lm(formula = mastitis ~ feed * breed, data = dat)
#> 
#> Residuals:
#>      Min       1Q   Median       3Q      Max 
#> -2.25984 -0.60241  0.07629  0.60307  1.82843 
#> 
#> Coefficients:
#>                            Estimate Std. Error t value Pr(>|t|)    
#> (Intercept)                  3.5537     0.1316  26.994  < 2e-16 ***
#> feed(high)                  -0.3506     0.1316  -2.663   0.0109 *  
#> breed(Angus)                -0.8802     0.1862  -4.728 2.56e-05 ***
#> breed(Hereford)             -0.1653     0.1862  -0.888   0.3795    
#> feed(high):breed(Angus)     -0.3722     0.1862  -1.999   0.0521 .  
#> feed(high):breed(Hereford)   0.3991     0.1862   2.144   0.0379 *  
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#> 
#> Residual standard error: 0.9121 on 42 degrees of freedom
#> Multiple R-squared:  0.5399, Adjusted R-squared:  0.4852 
#> F-statistic: 9.858 on 5 and 42 DF,  p-value: 2.755e-06

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